问答题
f(x)在[0,1]上有连续导数,且f(0)=0.证明:存在一点ξ∈[0,1],使得
f’(ξ)=2∫
0
1
f(x)dx.
【正确答案】正确答案:因为f'(x)在[0,1]上连续,所以f'(x)在[0,1]上有最小值和最大值,设为m,M,即存在x
1
,x
2
∈[0,1],使f'(x
1
)=m,f'(x
2
)=M: 由拉格朗日中值定理,对任意x∈[0,1],存在η∈(0,x),使f(x)=f(x)-f(0)=f'(η)x,于是有 f'(x
1
)x=mx≤f(x)=f(x)一f(0)=f'(η)x≤Mx=f'(x
2
)x, 两边积分得 f'(x
1
)∫
0
1
xdx≤∫
0
1
f(x)dx≤f'(x
2
)∫
0
1
xdx, 即
f'(x
1
)≤∫
0
1
f(x)dx≤
f'(x
2
),故f'(x
1
)≤2∫
0
1
f(x)dx≤f'(x
2
). 因为f'(x)在[0,1]上连续,由介值定理,必存在ξ∈[x
1
,x
2
]
[0,1],或ξ∈[x
2
,x
1
]
f'(x
1
)≤∫
0
1
f(x)dx≤
f'(x
2
),故f'(x
1
)≤2∫
0
1
f(x)dx≤f'(x
2
). 因为f'(x)在[0,1]上连续,由介值定理,必存在ξ∈[x
1
,x
2
]
[0,1],或ξ∈[x
2
,x
1
]
【答案解析】